Download - Log Normal
Log normal distribution (from http://www.math.wm.edu/˜leemis/chart/UDR/UDR.html)
The shorthand X ∼ log normal(α, β) is used to indicate that the random variable X has the log
normal distribution with parameters α and β. A log normal random variable X with parameters α
and β has probability density function
f (x) =1
xβ√
2πe−
12 (ln(x/α)/β)2
x > 0
for α and β > 0. The log normal distribution can be used to model the lifetime of an object, the
weight of a person, or a service time. The central limit theorem indicates that the log normal
distribution is useful for modeling random variables that can be thought of as a product of several
independent random variables. The probability density function with three different parameter
settings is illustrated below.
0 2 4 6 8 10
0.0
0.2
0.4
0.6
0.8
1.0
α=1, β=1
α=1, β=2
α=5, β=0.5
x
f (x)
The cumulative distribution function on the support of X is
F(x) = P(X ≤ x) =1
2+
1
2erf
(√2(ln(x)−α)
2β
)
x > 0,
where
erf(x) =2√
π
∫ x
0e−t2
dt.
The survivor function on the support of X is
S(x) = P(X ≥ x) =1
2−
1
2erf
(√2(ln(x)−α)
2β
)
x > 0.
The hazard function on the support of X is
h(x) =f (x)
S(x)=−
√2e−(ln(x)−α)2/2β2 1
√π
x−1β−1
(
−1+ erf
(√2(ln(x)−α)
2β
))−1
x > 0.
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The cumulative hazard function on the support of X is
H(x) =− lnS(x) = ln(2)+ iπ− ln
(
−1+ erf
(√2(ln(x)−α)
2β
))
x > 0.
The inverse distribution function, moment generating function, and characteristic function of X are
mathematically intractable.
The median of X is α.
The population mean, variance, skewness, and kurtosis of X are
E[X ] = αeβ2/2 V [X ] = α2eβ2
(eβ2
−1)
E
[
(
X −µ
σ
)3]
= (eβ2
+2)(eβ2
−1)1/2 E
[
(
X −µ
σ
)4]
= e4β2
+2e3β2
+3e2β2
−3
APPL verification: The APPL statements
assume(alpha > 0);
assume(beta > 0);
X := [[x-> (1/(x*beta*sqrt(2*Pi)))*exp((-1/2)*(ln(x/alpha)/beta)ˆ2)],
[0,infinity],["Continuous","PDF"]];
CDF(X);
SF(X);
HF(X);
CHF(X);
Mean(X);
Variance(X);
Skewness(X);
Kurtosis(X);
verify the cumulative distribution function, survivor function, hazard function, cumulative hazard
function, population mean, variance, skewness, and kurtosis.
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